Mathematical Palindromes

Date: 01/17/97 at 19:36:43
From: Anonymous
Subject: Fwd: Mathematical palindromes
Do you know anything about patterns concerning mathematical
palindromes and how they occur? I am doing a math project for school.
I am in the 4th grade. I have discovered that if you add the reverse
of a number to a number, you eventually will come to a palindrome.
If they are 2-digit numbers, the sum of the 2 digits in the original
number will determine the number of steps it takes to get to the
palindrome. I've also found information on the palindrome 121.
Are there any other patterns or facts about palindromes? I can't find
much. Thank you for your help.
Samantha

Date: 01/18/97 at 12:00:35
From: Doctor Lynn
Subject: Re: Fwd: Mathematical palindromes
Dear Samantha,
As far as I can tell, this is an unsolved problem of mathematics.
There is no easy way to tell how many steps it will take, but I think
you are right to think that with two digit numbers it is based
approximately on the digit sum.
Two numbers which are interesting in this field are 89 and 196.
89 takes 24 steps before it reaches a palindrome (and so does its
reverse, 98), and needs a pretty powerful calculator to show the
final answer. A computer program is best, but even then it
needs a mathematical programming language which can cope with
big numbers.
196 doesn't seem to reach a palindrome. To be more precise,
about ten years ago, (the last time I heard about this) no one knew
whether or not it did, so they will have tested it to thousands of
steps. They may have found proof whether or not it does by now, but
I haven't heard about it.
With the number 121, have you noticed the pattern of squares of
numbers made of rows of 1s?
These are:
1: 1
11: 121
111: 12321
1111: 1234321
11111: 123454321
111111: 12345654321
etc.
These are palindromes whose squares are palindromes too.
I'm very pleased you're showing an interest in mathematics and I'm
sorry I couldn't help more.
If you are interested in number patterns, you might find the number
142857 interesting. Try multiplying it by the numbers from 1 to 7...
-Doctor Lynn, The Math Forum
Check out our web site! http://mathforum.org/dr.math/
Note from the archivist: see also
http://mathforum.org/dr.math/problems/barnes10.11.html ,
which deals a little more extensively with the unsolved problem
mentioned above.